Hardy inequality and fractional Leibnitz rule for perturbed Hamiltonians on the line

Abstract

We consider the following perturbed Hamiltonian H= -∂x2 + V(x) on the real line. The potential V(x) is a real - valued function of short range type. We study the equivalence of classical homogeneous Sobolev type spaces Hsp, p ∈ (1,∞) and the corresponding perturbed homogeneous Sobolev spaces associated with the perturbed Hamiltonian. It is shown that the assumption zero is not a resonance guarantees that the perturbed and unperturbed homogeneous Sobolev norms of order s = γ - 1 ∈ [0,1/p) are equivalent. As a corollary, the corresponding wave operators leave classical homogeneous Sobolev spaces of order s ∈ [0,1/p) invariant.